Boundaries of relative factor graphs and subgroup classification for automorphisms of free products

Abstract

Given a countable group G splitting as a free product G=G1… Gk FN, we establish classification results for subgroups of the group Out(G,F) of all outer automorphisms of G that preserve the conjugacy classes of each Gi. We show that every finitely generated subgroup H⊂eq Out(G,F) either contains a relatively fully irreducible automorphism, or else it virtually preserves the conjugacy class of a proper free factor relative to the decomposition (the finite generation hypothesis on H can be dropped for G=FN, or more generally when G is toral relatively hyperbolic). In the first case, either H virtually preserves a nonperipheral conjugacy class in G, or else H contains an atoroidal automorphism. The key geometric tool to obtain these classification results is a description of the Gromov boundaries of relative versions of the free factor graph FF and the Z-factor graph ZF, as spaces of equivalence classes of arational trees (respectively relatively free arational trees). We also identify the loxodromic isometries of FF with the fully irreducible elements of Out(G,F), and loxodromic isometries of ZF with the fully irreducible atoroidal outer automorphisms.